Complex geometrical optics solutions for Lipschitz conductivities
Article Properties
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DOI (url)
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Publication Date2003/04/30
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Indian UGC (journal)
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Citations9
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Lassi Päivärinta University of Oulu, Finland
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Alexander Panchenko Pennsylvania State University, University Park, USA
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Gunther Uhlmann University of Washington, Seattle, United States
Cite
Päivärinta, Lassi, et al. “Complex Geometrical Optics Solutions for Lipschitz Conductivities”. Revista Matemática Iberoamericana, vol. 19, no. 1, 2003, pp. 57-72, https://doi.org/10.4171/rmi/338.
Päivärinta, L., Panchenko, A., & Uhlmann, G. (2003). Complex geometrical optics solutions for Lipschitz conductivities. Revista Matemática Iberoamericana, 19(1), 57-72. https://doi.org/10.4171/rmi/338
Päivärinta L, Panchenko A, Uhlmann G. Complex geometrical optics solutions for Lipschitz conductivities. Revista Matemática Iberoamericana. 2003;19(1):57-72.
Journal Category
Science
Mathematics
Citations
| Title | Journal | Journal Categories | Citations | Publication Date |
|---|---|---|---|---|
Convergence analysis of an alternating direction method of multipliers for the identification of nonsmooth diffusion parameters with total variation | Inverse Problems |
| 2023 | |
| Convergence rates for iteratively regularized Gauss–Newton method subject to stability constraints | Journal of Computational and Applied Mathematics |
| 11 | 2022 |
On the uniqueness of inverse problems for the reduced wave equation with unknown embedded obstacles | Inverse Problems |
| 2021 | |
Determining two coefficients in diffuse optical tomography with incomplete and noisy Cauchy data | Inverse Problems |
| 2020 | |
| Uniqueness in inverse acoustic scattering with unbounded gradient across Lipschitz surfaces | Journal of Differential Equations |
| 3 | 2018 |
Citations Analysis
| Category | Category Repetition |
|---|---|
| Science: Mathematics | 9 |
| Technology: Technology (General): Industrial engineering. Management engineering: Applied mathematics. Quantitative methods | 8 |
| Science: Physics | 5 |
The category
Science: Mathematics 9
is the most commonly referenced area in studies that cite this article. The first research to cite this article was titled The Calderón Problem with Partial Data for Less Smooth Conductivities and was published in 2006. The most recent citation comes from a 2023 study titled Convergence analysis of an alternating direction method of multipliers for the identification of nonsmooth diffusion parameters with total variation. This article reached its peak citation in 2010, with 2 citations. It has been cited in 5 different journals. Among related journals, the Inverse Problems cited this research the most, with 5 citations. The chart below illustrates the annual citation trends for this article.